As I know, for a linear continuous time system to be stable, it has to have negative real part eigenvalues. But for discrete systems, it is okay to have also plus values as long as the complex eigenvalues are within the unit circle. That is $\sqrt{Re(\lambda)+Im(\lambda)}<1$. I dont understand why this is the case with discrete systems, maybe someone can help. Thanks
2025-01-15 06:43:39.1736923419
Stability for linear discrete Systems
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